What is Hooke's Law?
Hooke's Law is a physics principle stating that the restoring force of a spring is directly proportional to its extension (or compression), as long as it remains within its elastic limit. It is expressed by the formula F = -k × Δx, where the negative sign indicates that the restoring force always opposes the direction of displacement. Kalkulab's Hooke's Law Calculator is designed to help high school students (grades 10-12), engineering students, and mechanical practitioners understand the behavior of elastic objects. This tool covers five main calculations: (1) Spring force (F), (2) Spring constant (k), (3) Extension/compression (Δx), (4) Elastic potential energy (Ep), and (5) Series and parallel spring circuit systems.
Hooke's Law & Spring Energy Formula
F = -k × ΔxFormula: Ep = ½ × k × (Δx)² ; kt(series) = 1/(1/k₁ + 1/k₂ + ...) ; kt(parallel) = k₁ + k₂ + ...Variables:
- FRestoring Force (Newtons)Force produced by the spring(e.g.: 10 N)💡 Force on motorcycle shock absorber
- kSpring Constant (N/m)Spring stiffness, larger means stiffer(e.g.: 100 N/m)💡 Spring bed stiffness
- ΔxExtension (meters)Change in length from equilibrium position(e.g.: 0.05 m)💡 Scale spring compression
- EpPotential Energy (Joules)Energy stored in the spring(e.g.: 1.25 J)💡 Energy in toy spring
- ktTotal Constant (N/m)Combined constant of spring circuit(e.g.: 200 N/m)💡 Vehicle suspension system
Hooke's Law & Spring Circuits
Hooke's Law states F = -kx (force is proportional to displacement). Spring potential energy Ep = ½kx². For circuits: Series results in smaller total stiffness (more flexible), Parallel results in larger total stiffness (stiffer).
- 1Hooke's Law: F = -k × Δx - Restoring force opposes displacement
- 2Spring Energy: Ep = ½ × k × (Δx)² - Energy stored in the spring
- 3Series: 1/kt = 1/k₁ + 1/k₂ + ... - Total stiffness decreases
- 4Parallel: kt = k₁ + k₂ + ... - Total stiffness increases
Categories:
How to Use the KalkuLab Hooke's Law Calculator
This calculator has 5 main calculation modes. Follow these steps based on your needs:
- 1
Choose Calculation Mode
Select: (1) Force (F), (2) Spring constant (k), (3) Extension (x), (4) Energy (Ep), or (5) Spring circuits (Series/Parallel).
- 2
Enter Known Values
For single mode: enter 2 known values (e.g., k and x) to find the third (F or Ep). Use SI units (N, m, N/m, J).
- 3
Enter Spring Circuit (Mode 5)
For series/parallel circuits, enter spring constants separated by commas. Example: 100, 200, 150 (in N/m).
- 4
Press Calculate
Click calculate for instant results. For circuits, choose Series or Parallel mode.
- 5
Analyze Results
Use results to understand elasticity or design simple spring systems. Watch elastic limits!
💡 Tip:
- •The negative sign (-) in F = -kx means restoring force opposes displacement direction
- •1 cm = 0.01 m. Convert cm to m before calculating
- •Higher k (spring constant) means a stiffer spring (more force needed to stretch)
- •In series, kt is smaller than the smallest constant (more flexible)
- •In parallel, kt is larger than the largest constant (stiffer)
- •Hooke's Law applies only within the elastic limit (before plastic deformation)
Examples
Example 1: Force on a Motorcycle Shock Absorber
A motorcycle shock absorber has spring constant 1000 N/m. If compressed 5 cm, what force is produced?
- 1.Given: k = 1000 N/m, Δx = 5 cm = 0.05 m
- 2.Use: F = k × Δx
- 3.F = 1000 × 0.05 = 50 N
The shock absorber produces 50 N restoring force when compressed 5 cm. This force dampens road bumps.
Example 2: Spring Scale Constant
A spring scale reads 2 kg (19.6 N) when loaded and the spring extends 8 cm. What is the spring constant?
- 1.Given: F = 2 kg × 9.8 m/s² = 19.6 N, Δx = 8 cm = 0.08 m
- 2.From F = k × Δx: k = F / Δx
- 3.k = 19.6 / 0.08 = 245 N/m
The spring constant is 245 N/m. A higher value means a stiffer scale spring.
Example 3: Toy Spring Potential Energy
A toy spring with k = 500 N/m is compressed 3 cm. What potential energy is stored?
- 1.Given: k = 500 N/m, Δx = 3 cm = 0.03 m
- 2.Use: Ep = ½ × k × (Δx)²
- 3.Ep = 0.5 × 500 × (0.03)² = 0.225 J
0.225 Joule is stored. This energy drives the toy when the spring is released.
Example 4: Parallel Springs on a Mattress
A mattress uses two parallel springs of 1500 N/m and 2000 N/m. What is the total spring constant?
- 1.Given: k₁ = 1500 N/m, k₂ = 2000 N/m (parallel)
- 2.Parallel formula: kt = k₁ + k₂
- 3.kt = 1500 + 2000 = 3500 N/m
Total constant is 3500 N/m. Two parallel springs make the system stiffer than either alone.
Example 5: Series Springs on Car Suspension
A suspension uses two series springs of 3000 N/m and 6000 N/m. What is the total constant? What is the advantage of series?
- 1.Given: k₁ = 3000 N/m, k₂ = 6000 N/m (series)
- 2.Series formula: 1/kt = 1/k₁ + 1/k₂
- 3.1/kt = 1/3000 + 1/6000 = 0.0005
- 4.kt = 2000 N/m
Total constant is 2000 N/m, smaller than the weakest spring (3000 N/m). Series arrangement gives a softer, more comfortable ride.